Download presentation
1
Chapter 6 PRODUCTION
2
CHAPTER 6 OUTLINE 6.1 The Technology of Production 6.2 Production with One Variable Input (Labor) 6.3 Production with Two Variable Inputs 6.4 Returns to Scale
3
Production The Production Decisions of a Firm
The theory of the firm describes how a firm makes cost-minimizing production decisions and how the firm’s resulting cost varies with its output. The Production Decisions of a Firm The production decisions of firms are analogous to the purchasing decisions of consumers, and can likewise be understood in three steps: Production Technology Cost Constraints Input Choices
4
THE TECHNOLOGY OF PRODUCTION
● Factors of production - Inputs into the production process (e.g., labor, capital, and materials) The Production Function (6.1) ● Production function - Function showing the highest output that a firm can produce for every specified combination of inputs Remember the following: Inputs and outputs are flows. Equation (6.1) applies to a given technology. Production functions describe what is technically feasible when the firm operates efficiently.
5
THE TECHNOLOGY OF PRODUCTION
The Short Run versus the Long Run ● Short run - Period of time in which quantities of one or more production factors cannot be changed ● Fixed input - Production factor that cannot be varied ● Long run - Amount of time needed to make all production inputs variable
6
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
Average and Marginal Products ● Average product - Output per unit of a particular input ● Marginal product - Additional output produced as an input is increased by one unit Average product of labor = Output/labor input = q/L Marginal product of labor = Change in output/change in labor input = Δq/ΔL
7
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
TABLE 6.1 Production with One Variable Input 10 — 1 2 30 15 20 3 60 4 80 5 95 19 6 108 18 13 7 112 16 8 14 9 12 4 100 8 Amount of Labor (L) Amount of Capital (K) Total Output (q) Average Product (q/L) Marginal Product (∆q/∆L)
8
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
The Slopes of the Product Curve Figure 6.1 Production with One Variable Input The total product curve in (a) shows the output produced for different amounts of labor input. The average and marginal products in (b) can be obtained (using the data in Table 6.1) from the total product curve. At point A in (a), the marginal product is 20 because the tangent to the total product curve has a slope of 20. At point B in (a) the average product of labor is 20, which is the slope of the line from the origin to B. The average product of labor at point C in (a) is given by the slope of the line 0C.
9
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
The Slopes of the Product Curve Figure 6.1 Production with One Variable Input (continued) To the left of point E in (b), the marginal product is above the average product and the average is increasing; to the right of E, the marginal product is below the average product and the average is decreasing. As a result, E represents the point at which the average and marginal products are equal, when the average product reaches its maximum. At D, when total output is maximized, the slope of the tangent to the total product curve is 0, as is the marginal product.
10
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
The Law of Diminishing Marginal Returns ● law of diminishing marginal returns Principle that as the use of an input increases with other inputs fixed, the resulting additions to output will eventually decrease. Figure 6.2 The Effect of Technological Improvement Labor productivity (output per unit of labor) can increase if there are improvements in technology, even though any given production process exhibits diminishing returns to labor. As we move from point A on curve O1 to B on curve O2 to C on curve O3 over time, labor productivity increases.
11
PRODUCTION WITH ONE VARIABLE INPUT (LABOR)
Labor Productivity ● labor productivity Average product of labor for an entire industry or for the economy as a whole. Productivity and the Standard of Living ● stock of capital Total amount of capital available for use in production. ● technological change Development of new technologies allowing factors of production to be used more effectively.
12
PRODUCTION WITH TWO VARIABLE INPUTS
Isoquants TABLE 6.4 Production with Two Variable Inputs Capital Input 1 2 3 4 5 20 40 55 65 75 60 85 90 100 105 110 115 120 LABOR INPUT ● isoquant Curve showing all possible combinations of inputs that yield the same output.
13
PRODUCTION WITH TWO VARIABLE INPUTS
Isoquants ● isoquant map Graph combining a number of isoquants, used to describe a production function. Figure 6.4 Production with Two Variable Inputs A set of isoquants, or isoquant map, describes the firm’s production function. Output increases as we move from isoquant q1 (at which 55 units per year are produced at points such as A and D), to isoquant q2 (75 units per year at points such as B) and to isoquant q3 (90 units per year at points such as C and E).
14
PRODUCTION WITH TWO VARIABLE INPUTS
Diminishing Marginal Returns Holding the amount of capital fixed at a particular level—say 3, we can see that each additional unit of labor generates less and less additional output.
15
PRODUCTION WITH TWO VARIABLE INPUTS
Substitution Among Inputs ● marginal rate of technical substitution (MRTS) Amount by which the quantity of one input can be reduced when one extra unit of another input is used, so that output remains constant. MRTS = − Change in capital input/change in labor input = − ΔK/ΔL (for a fixed level of q) Figure 6.5 Marginal Rate of Technical Substitution Like indifference curves, isoquants are downward sloping and convex. The slope of the isoquant at any point measures the marginal rate of technical substitution—the ability of the firm to replace capital with labor while maintaining the same level of output. On isoquant q2, the MRTS falls from 2 to 1 to 2/3 to 1/3. (6.2)
16
PRODUCTION WITH TWO VARIABLE INPUTS
Production Functions—Two Special Cases Figure 6.6 Isoquants When Inputs Are Perfect Substitutes When the isoquants are straight lines, the MRTS is constant. Thus the rate at which capital and labor can be substituted for each other is the same no matter what level of inputs is being used. Points A, B, and C represent three different capital-labor combinations that generate the same output q3.
17
PRODUCTION WITH TWO VARIABLE INPUTS
Production Functions—Two Special Cases ● fixed-proportions production function Production function with L-shaped isoquants, so that only one combination of labor and capital can be used to produce each level of output. The fixed-proportions production function describes situations in which methods of production are limited. Figure 6.7 Fixed-Proportions Production Function When the isoquants are L-shaped, only one combination of labor and capital can be used to produce a given output (as at point A on isoquant q1, point B on isoquant q2, and point C on isoquant q3). Adding more labor alone does not increase output, nor does adding more capital alone.
18
PRODUCTION WITH TWO VARIABLE INPUTS
Figure 6.8 Isoquant Describing the Production of Wheat A wheat output of 13,800 bushels per year can be produced with different combinations of labor and capital. The more capital-intensive production process is shown as point A, the more labor- intensive process as point B. The marginal rate of technical substitution between A and B is 10/260 = 0.04.
19
RETURNS TO SCALE ● returns to scale Rate at which output increases as inputs are increased proportionately. ● increasing returns to scale Situation in which output more than doubles when all inputs are doubled. ● constant returns to scale Situation in which output doubles when all inputs are doubled. ● decreasing returns to scale Situation in which output less than doubles when all inputs are doubled.
20
RETURNS TO SCALE Describing Returns to Scale
Figure 6.9 Returns to Scale When a firm’s production process exhibits constant returns to scale as shown by a movement along line 0A in part (a), the isoquants are equally spaced as output increases proportionally. However, when there are increasing returns to scale as shown in (b), the isoquants move closer together as inputs are increased along the line.
21
Carpet Sales, 2005 (Millions of Dollars per Year)
RETURNS TO SCALE Over time, the major carpet manufacturers have increased the scale of their operations by putting larger and more efficient tufting machines into larger plants. At the same time, the use of labor in these plants has also increased significantly. The result? Proportional increases in inputs have resulted in a more than proportional increase in output for these larger plants. TABLE The U.S. Carpet Industry Carpet Sales, 2005 (Millions of Dollars per Year) Shaw 4346 Mohawk 3779 Beaulieu 1115 Interface 421 Royalty 298
Similar presentations
© 2024 SlidePlayer.com Inc.
All rights reserved.